Inner functions on spaces of homogeneous type

## Lipschitz Functions on Spaces of Homogeneous Type Results on the geometric structure of spaces of homogeneous type are obtained and applied to show the equivalence of certain classes of Lipschitz functions defined on these spaces. ## I. YOTATION AND DEFINITIONS By a quasi-distance on a set X

The notion of spaces of a generalized homogeneous type is developed in [2]. In this paper, we introduce the sharp maximal function in this general setting, and establish the equivalence of the L p norms between the sharp maximal function and the Hardy Littlewood maximal function, as well the John Ni

## Abstract Curvature homogeneous spaces have been studied by many authors. In this paper, we introduce and study a natural modification of this class, namely so‐called curvature homogeneous spaces of type (1,3). We present a class of proper examples in every dimension and we prove a classification

8 1. Introduction. Let T be a homogeneous isotropic tree of order q+ 1, q z 2 . That is, T is a connected graph, i t has no non-trivial loops, and a t each node (I + I edges project. Thus each node has exactly q + 1 nearest neighbors, between any two nodes there is a unique shortest path (a geodesi